Open Gromov-Witten Theory of K_(mathbb P²), K_{{mathbb P¹}times {mathbb P¹}}, K_(Wmathbb P[1,1,2]), K_(mathbb F₁) and Jacobi Forms
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It was known through the efforts of many works that the generating functions in the closed Gromov-Witten theory of $K_{\mathbb P^2}$ are meromorphic quasi-modular forms basing on the B-model predictions. In this article, we extend the modularity phenomenon to $K_{{\mathbb P^1}\times {\mathbb P^1}}, K_{W\mathbb P[1,1,2]}, K_{\mathbb F_1}$. More importantly, we generalize it to the generating functions in the open Gromov-Witten theory using the theory of Jacobi forms where the open Gromov-Witten parameters are transformed into elliptic variables.
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Cited by 1 Pith paper
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Quasi-modularity and holomorphic anomaly equation for the twisted Gromov-Witten theory: $\mathcal{O}(3)$ over $\mathbb{P}^2$
Proves quasi-modularity and derives holomorphic anomaly equation for twisted GW theory of O(3) over P².
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